Compute the standard deviation of those 10 means and compare the standard deviation of the 10 means to the population standard deviation of all 100 listing prices.

Here I attached work week 2 for use as a reference as it is the continuation .

I need this no more late than Monday June 21, 2016 at 9 am in the morning.

Sampling Distributions – Real Estate Part 2

Use the real estate data that you used for your learning team project that was due in Week 2.

Complete the Sampling Distributions – Real Estate Part 2 worksheet.

Format your assignment consistent with SPA guidelines.

Click the Assignment Files tab to submit your assignment.

Sampling Distributions – Real Estate Part 2

Directions: Use the real estate data you used for your Week 2 learning team assignment.Analyze the data and explain your answers.

Review the data and for the purpose of this project please consider the 100 listing prices as a population.

·         Explain what your computed population mean and population standard deviation were.

2.     Divide the 100 listing prices into 10 samples of n=10 each. Each of your 10 samples will tend to be random if the first sample includes houses 1 through 10 on your spreadsheet, the second sample consists of houses 11 through 20, and so on.

·         Compute the mean of each of the 10 samples and list them:

3.     Compute the mean of those 10 means.

·         Explain how the mean of the means is equal,or not, to the population mean of the 100 listing prices from above.

4.     Compute the standard deviation of those 10 means and compare the standard deviation of the 10 means to the population standard deviation of all 100 listing prices.

·         Explain why it is significantly higher, or lower, than the population standard deviation.

5.     Explain how much more or less the standard deviation of sample means was than the population standard deviation. According to the formula for standard deviation of sample means, it should be far less.  (That formula is σ = σ/√n  =  σ/√10  = σ/3.16  )  Does your computed σ  agree with the formula?

6.     According to the Empirical Rule, what percentage of your sample means should be within 1 standard deviation of the population mean?  Using your computed σ, do your sample means seem to conform to the rule?

7.     According to the Empirical Rule, what percentage of your sample means should be within 2 standard deviations of the population mean?  Again, do your sample means seem to conform to the rule?

 

8.     You used the Empirical Rule because it really gives us more information (and because I asked you to), but truthfully you should have used Kuibyshev Theorem.  Even though Kuibyshev doesn’t tell us much, why should you have used that one instead?

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